Superconducting composite

ABSTRACT

The invention provides a superconductor comprising particles made of a superconductive material, and a conductive material. The conductive material is selected to be driven to a superconductive state when in proximity to the superconductive material, and preferably at least includes bismuth. An unbroken length of the conductive material is located sufficiently close to a plurality of the particles to be driven to a superconductive state by the superconductive material.

CROSS-REFERENCE TO RELATED APPLICATIONS

The present patent application claims priority from U.S. Patent Application No. 60/600,537, filed on Aug. 10, 2004.

BACKGROUND OF THE INVENTION

1). Field of the Invention

The present invention relates to a superconductor.

2). Discussion of Related Art

The discovery of high critical temperature (Tc) superconducting ceramics (HTS ceramics) has inspired an enormous interest in their application. Conventional niobium alloy superconductors such as NbTi must be cooled to below 10K to achieve useful superconductivity. HTS superconductors, on the other hand, can have Tcs over 100K. Due to the great expense of cryogenic refrigeration, the HTS ceramics could find much wider application in industrial and laboratory devices. Of particular interest are materials which have Tc above 77K, because this is the temperature of liquid nitrogen, a common and relatively inexpensive refrigerant.

HTS ceramics have not been used in many potential applications because they suffer from a number of shortcomings. The most severe problems with the HTS ceramics are as follows:

-   -   1) HTS ceramics are brittle. They are not flexible and thus         cannot readily be made into wires or other useful shapes. Cracks         and boundaries between adjacent crystals severely limit         supercurrent flow.     -   2) HTS ceramics are highly anisotropic. Supercurrents         preferentially flow in certain directions with respect to the         crystal lattice, reducing the maximum current density in         randomly oriented multicrystalline pieces.     -   3) HTS ceramics are strong oxidizing agents. Most metals, such         as copper, lead, tin, aluminum, indium, and niobium, are         oxidized by contact with the ceramic superconductors. Insulating         oxide layers impede supercurrent flow. Only noble metals such as         gold, silver palladium and their alloys are not oxidized by the         HTS ceramics.

A less severe undesirable feature of the HTS ceramics is that they can lose their superconducting properties under certain circumstances. The superconducting structure inside the HTS ceramics has an abundance of oxygen atoms which are necessary for superconductivity. Heating, grinding, etching, or prolonged exposure to ambient atmosphere or vacuum may liberate the oxygen and destroy superconductivity. Both the oxygen content and the superconductivity can be restored by annealing the HTS ceramic in an atmosphere of oxygen.

It would be an advance in the art of applied superconductivity to provide a superconducting wire employing HTS ceramics that is ductile, has a high Tc, and has a high critical current density (Jc). Such a wire must overcome the problems with the HTS ceramics. Prior art HTS ceramic wires made of a combination of HTS ceramic particles in a silver matrix generally have poor superconducting properties such as low Jc. Also, bending the prior art wires tends to greatly reduce the Jc. This is highly undesirable.

There are other superconductor materials which have some of the same disadvantages as HTS cuprate materials. For example, the A15 family of superconductors such as Nb3Sn are also brittle materials (although they are not anisotropic and relatively nonreactive). Their poor mechanical properties have precluded their use in many applications requiring high current conductors with robust current carrying properties under mechanical stress, such as in a superconducting motor or generator. This is unfortunate because they generally have good superconducting properties such as high critical current densities in high magnetic fields. Also, with a Tc of approximately 18K, Nb3Sn-based superconducting devices are restricted to operation at temperatures less than 10K, which is not economical for many superconducting applications.

Recently, the discovery of superconductivity near 40K in MgB2 has inspired an enormous interest in their application for use in superconducting devices operating between 10K and 30K. Device operation at temperatures greater than 20K precludes the use of the technical superconductors NbTi and Nb3Sn. Similar to HTS ceramics and the A15 superconductors, the poor mechanical properties of MgB2 makes it difficult to fabricate ductile, robust wire or tape with high critical currents. Nevertheless, with a significantly lower materials cost relative to HTS ceramics, the development of high performance MgB2 conductors may enable the economic adoption of superconducting devices such as MRI magnets, transformers, motors, and generators in this intermediate temperature range.

Other examples of brittle, nonductile superconductors include materials possessing the NaCl crystal structure (the AB family), Laves phase ceramics, Chevrel phase ceramics, and metallic borides. These materials may have superior superconducting properties, but are unusable in many applications (e.g., conducting wires) because they are brittle. It would be an advance in the art of applied superconductivity to provide flexible wires made from brittle superconductor materials.

U.S. Pat. No. 5,091,362 to Ferrando discloses a method for forming a silver coating on HTS ceramic particles. U.S. Pat. No. 4,971,944 to Charles et al. teaches a method for electroless deposition of gold onto HTS ceramic particles.

U.S. Pat. No. 5,041,416 to Wilson describes a superconducting composite material. Powders of HTS ceramic and normal metal are mixed and the mixture is subjected to heat and high pressure. The composite materials of Wilson have a relatively low Jc due to reactivity between the HTS ceramics and the metal matrix. The wires also have a low Jc if silver is used as the normal metal.

U.S. Pat. No. 5,202,307 to Hayashi describes a superconducting composite material having HTS ceramic particles in a metal matrix. The composite materials of Hayashi have a relatively low Jc due to reactivity between the HTS ceramic particles and the metal matrix and/or due to poor superconducting properties of the metal matrix materials.

U.S. Pat. No. 5,194,420 to Akihama describes a composite cuprate superconductor/metal superconducting material consisting of HTS ceramic particles dispersed in a matrix of silver. The composite materials of Akihama will also have a relatively low critical current density due to the choice of silver as the metal matrix material.

U.S. Pat. No. 5,081,072 to Hosokawa et al. describes a method preparing a HTS superconducting ceramic powder and forming the powder into a superconducting material. A low Jc is also a problem with the materials of Hosokawa.

U.S. Pat. No. 5,547,924 to Ito et al. describes a superconducting ceramic composite material having HTS ceramic particles in a noble metal matrix. The composite materials have relatively poor superconducting properties due to the poor superconducting properties of the metal matrix materials used.

U.S. Pat. No. 5,132,278 to Stevens et al. describes a cuprate superconductor wire having continuous filaments of HTS ceramic surrounded by metal matrix. A noble metal chemically protects the HTS ceramic. The wires of Stevens et al. are characterized in that they do not conduct current between wires, and do not rely on the superconducting proximity effect.

There exists a need for a superconducting composite material that is ductile and has a high Jc that is not reduced by bending. Also, there exists a need for ductile superconducting composite materials made from brittle superconductors that have a high current carrying properties at high temperatures in modest magnetic fields.

SUMMARY OF THE INVENTION

The invention provides a superconductor composite material comprising particles made of a superconductive material, and a conductive material. The conductive material is selected to be driven to a superconductive state when in proximity to the superconductive material, and preferably at least includes bismuth. An unbroken length of the conductive material is located sufficiently close to a plurality of the particles to be driven to a superconductive state by the superconductive material.

The superconductive material may be a planar diboride.

The planar diboride is preferably magnesium diboride.

The invention also provides a method of making such a superconductor. The invention also provides a method of making a wire of such a superconductor. An elongate member may be assembled from the particles and the conductive material, and be drawn into a wire.

BRIEF DESCRIPTION OF THE DRAWINGS

The invention is further described by way of example with reference to the accompanying drawings wherein:

FIG. 1 is a cross-sectional view of an embodiment of the present invention having superconducting particles disposed in a metal matrix material;

FIG. 2 is a graph illustrating the variation of the superconducting gap magnitude near a boundary between a superconductor and a metal;

FIG. 3 is a graph illustrating the variation of the superconducting gap magnitude near a boundary between a superconductor and a metal having a low λ value;

FIG. 4 is a graph illustrating the variation of the superconducting gap magnitude near a boundary between a superconductor and a metal having a high λ value;

FIG. 5 illustrates the extent of the superconducting proximity effect around a particle of superconducting material disposed within a metal matrix;

FIG. 6 shows how a number of superconducting particles disposed in a metal matrix provide a continuous supercurrent path through the matrix material;

FIG. 7 is a graph of critical current density (Jc) versus volume % matrix material for four different matrix materials (silver, aluminum, indium, and lead), the plot illustrates that high metals are better proximity superconductors than low metals. The superconductor material used was Nb3Sn;

FIG. 8 is a graph of critical temperature (Tc) versus volume % matrix material for four different matrix materials (silver, aluminum, indium, and lead);

FIG. 9 is a graph of E-field vs. current, illustrating the meaning of an n-value for a superconducting material, as is known in the art;

FIG. 10 is a graph of n-value versus volume % matrix material for four different matrix materials (silver, aluminum, indium, and lead);

FIG. 11 is a graph of Jc versus normalized electron-phonon coupling constant for different matrix materials;

FIG. 12 is a cross-sectional view of an embodiment of the present invention where the superconductor particles are coated with a chemically compatible metal coating to chemically protect the superconductor particles from the metal matrix materials;

FIG. 13 is a graph of critical density versus normalized electron-phonon coupling constant for the embodiment of FIG. 12 having a silver coating surrounding each superconductor particle;

FIG. 14 is a graph illustrating the prevailing, incorrect model of the superconducting proximity effect in a three-layer system;

FIG. 15 is a graph illustrating the current model of the superconducting proximity effect in a 3-layer system, as developed by the present inventor;

FIG. 16 is a cross-sectional view of an embodiment of the present invention using HTS ceramics as the superconducting particles. The particles are coated with a thin coating of noble metal that is not oxidized by the HTS ceramics particles;

FIG. 17 illustrates how the embodiment of FIG. 16 provides a continuous supercurrent path through the matrix material.

FIG. 18 is a side view of a sheet of protective material with superconductor particles in granular form deposited thereon;

FIG. 19 is a view similar to FIG. 18 wherein the superconductor particles are spread over the sheet;

FIG. 20 is a view similar to FIG. 19 after another sheet of protective material is located on the superconductor particles;

FIG. 21 is a perspective view of a composite sheet which is formed after a sheet of conductive material is located on the top protective sheet of FIG. 20;

FIG. 22 is a perspective view of an elongate member that is formed by folding, or rolling the composite sheet of FIG. 21;

FIG. 23 is a side view illustrating how the elongate member of FIG. 22 is rolled into a wire;

FIG. 24 is a cross-sectional view of the elongate member before being rolled;

FIG. 25 is a cross-sectional view of the wire after being rolled;

FIG. 26 is a cross-sectional view on 26-26 of the wire in FIG. 25 illustrating how the conductive material is induced to a superconductive state by the superconductor particles;

FIG. 27 is a cross-sectional view illustrating a two component wire that is made according to a method similar to that of FIG. 25;

FIG. 28 is a cross-sectional view on 28-28 of the wire of FIG. 27;

FIG. 29 is a cross-sectional view of a three-component granule used for powder-in-tube manufacture of wire;

FIG. 30 is a cross-sectional view of an elongate member which is symbolizing a plurality of the granules of the FIG. 29;

FIG. 31 is a cross-sectional view of wire being rolled from the elongate member of FIG. 30;

FIG. 32 is a cross-sectional view of a two component granule used for making three-component wire in a powder-in-tube manufacturing process;

FIG. 33 is a cross-sectional view of an elongate member which is assembled utilizing a plurality of the granules of FIG. 32;

FIG. 34 is a cross-sectional view of wire that is rolled out of the elongate member of FIG. 33;

FIG. 35 is a cross-sectional view of a superconductor particle having exposed outer surfaces;

FIG. 36 is a cross-sectional view of an elongate member that is assembled from a plurality of the superconductor particles of FIG. 35 and other components for purposes of making wire according to a three-component powder-in-tube method;

FIG. 37 is a cross-sectional view of a wire that is drawn from the elongate member of FIG. 36;

FIG. 38 is a cross-sectional view of a two component granule used for making a two component wire in a powder-in-tube process;

FIG. 39 is a cross-sectional view of an elongate member which is assembled from a plurality of the granules of FIG. 38;

FIG. 40 is a cross-sectional view of a wire that is drawn from the elongate member of FIG. 39;

FIG. 41 is a cross-sectional view of a superconductor particle having bare outer surfaces that is used for making a two component wire in a powder-in-tube process;

FIG. 42 is a cross-sectional view of an elongate member which is assembled from a plurality of the granules of FIG. 41 and other components for making a two component wire;

FIG. 43 is a cross-sectional view of a wire that is drawn from the elongate member of FIG. 42;

FIG. 44 is a graph illustrating the performance of gallium-based superconductor/metal matrix composite (SMMC) tape under the influence of approximately 2% bending strain. The superconductor material used was MgB2.

FIG. 45 is a graph illustrating the increased performance of gallium-based superconductor/metal matrix composite (SMMC) tape. The superconductor material used was MgB2.

FIG. 46 shows the scanning electron micrographs of polished cross sections of mono-filament magnesium diboride-based SMMC wire.

FIG. 47 shows a close-up of the copper/SMMC interface of mono-filament MgB2/Ga SMMC wire.

DETAILED DESCRIPTION OF THE INVENTION Materials and Compositions

FIG. 1 shows a magnified view of a composite material 20 according to the present invention. The composite material 20 has superconductor particles 22 made of a brittle superconductor disposed in a metal matrix material 24. The superconductor particles 22 can have a wide range of sizes, and the sizes of the particles 22 do not need to be uniform. Superconductor powders composed of particles of different sizes may have packing densities higher than that of mono-disperse powders. Preferably, powder-in-tube superconducting wire contains single or multiple filaments each with a high packing density of superconducting composite. Bimodal particle size distributions in powders, for example, tend to pack at higher densities than mono-disperse powders because the smaller particles effectively fill in the void spaces that form between the larger particles. The superconductor particles preferably have sizes generally within the range of 1.5 nanometers to 10 microns in diameter, for example. The particles 22 are made of a brittle superconducting material, such as an A15 compound, AB family superconductors, HTS ceramics, Laves phase superconductors, Chevrel phase superconductors, metallic borides or the like. Preferably, the particles are made of a material having a relatively high critical temperature (e.g., greater than 20K). Also preferably, the particles have high critical magnetic fields (e.g., greater than 5 T). In general, the superconductor particles preferably have robust superconducting properties.

There are preferably no insulating contaminants between the superconductor particles 22 and the metal matrix material 24. A thin layer of grease, oxide or any other insulating material between the superconductor particles and metal matrix material can seriously degrade the superconducting properties of the composite material 20 by impeding supercurrent flow through the superconductor particle/metal matrix interface. A small degree of insulating contamination at the superconductor/metal interface may exist, but it is important that the level of contamination is minimized such that the proximity effect is not completely suppressed in the metal matrix. In addition, certain superconductor/metal matrix combinations, for example, may benefit from a certain amount of insulating surface impurities on the superconductor particles. These localized insulating impurities on the superconductor surface may seed the growth of the metal upon the superconductor surface and thus aid in the overall wetting of the superconductor particle by the metal matrix. This wetting will establish low resistance contacts on a substantial portion of the superconductor/metal interfaces and thus will improve the properties of the superconductor composite.

The particles 22 preferably have dimensions larger than the superconducting coherence length of the superconductor material. Preferably, the superconductor particles have dimensions of about 3-500 times the superconducting coherence length of the superconductor particles, more preferably, the superconductor particles are about 5 to 10 times larger than the superconducting coherence length of the ceramic material. For most superconductor particle materials, it is preferable for the intrinsic superconductor particles to have dimensions less than 10 microns. The best size range for the superconductor particles depends upon the temperature at which the composite material is used, the λ of the metal matrix material, the superconductor coherence length of the superconductor particles, the proximity effect decay length of the metal matrix material, and the inelastic mean free path of the metal matrix material (explained below), and possibly other factors such as the filament size in a powder-in-tube superconductor/metal matrix composite wire or tape. For example, if the final filament diameter in a powder-in-tube wire or tape is 50 microns, then the maximum average particle size of the brittle superconductor particles should be less than 10% of the filament diameter (i.e., 5 microns). Preferably, the maximum average particle size of the brittle superconductor particles should be less than 5% of the filament diameter (i.e., 2.5 microns). Most Preferably, the maximum average particle size of the brittle superconductor particles should be less than 1% of the filament diameter (i.e., 1 micron). The lower limit of the preferable maximum average particle size is determined by the coherence length of the brittle superconductor particle.

For example, the A15 superconducting compounds (e.g., Nb3Sn, Nb3Ge, Nb3A1, V3Ga, V3Si, V3A1, V3In, Nb3Ga, V3Ge, Nb3Ge, Nb3Si, Ta3Pb, Ta3Au and Mo3R) generally have superconducting coherence lengths of approximately 2-3 nanometers. Therefore, for A15 compounds, the superconductor particles preferably have dimensions greater than 2-3 nanometers. For A15 compounds, particle sizes are preferably in the range of 100-5000 nm, or more preferably 10-500 nanometers. Larger sizes are also possible, but are typically less preferred because they may produce composites having less than optimal superconducting and mechanical properties.

Table 1 below lists several candidate materials useful for the intrinsic superconductor particles, their coherence lengths and their critical temperatures.

TABLE 1 Candidate Superconductor Materials Family/ Critical Maximum Coherence Superconductor Phase Temperature Length A15 Compounds A15 11-25 K  2-3 nm MoC AB 14.3 K NbN AB 17.3 K 4.0 nm ZrN AB 10.7 K CaRh₂ Laves  6.4 K CaIr₂ Laves  6.2 K ZrV₃ Laves  9.6 K 4.5 nm HfV₂ Laves  9.4 K 3.9 nm Mo₆S₈ Chevrel  1.6 K Cu₂Mo₆S₈ Chevrel 10.7 K Yb_(1.2)Mo₆S₈ Chevrel  8.7 K LaMo₆S₈ Chevrel  6.6 K 7.8 nm LaMo₆S Chevrel 11.7 K Pb_(0.9)Mo₆S_(7.5) Chevrel 15.2 K 2.0 nm PbMo₆S₈ Chevrel 12.6 K 2.3 nm BrMo₆S₈ Chevrel 13.8 K MgB₂ Metallic 40.2 K   5 nm Borides

Materials useful for the intrinsic superconductor particles are not necessarily limited to those listed in Table 1.

The metal matrix material 24 is preferably made of a ductile metal (elemental metal, metal alloy, or metal mixture) that is susceptible to the superconducting proximity effect. In order to be susceptible to the proximity effect, the metal matrix material preferably has a high electron-boson coupling coefficient, typically an electron-phonon coupling coefficient, λ (a unitless number). The metal matrix material must have a λ greater than 0.2. More preferably the metal matrix material has a λ greater than 0.5, and most preferably the metal matrix material has a λ greater than 1.0. All else being equal, the higher the λ, the better. This is because the susceptibility to the proximity effect increases with λ. Table 2 below shows candidate matrix materials and their electron-phonon coupling coefficients.

TABLE 2 Candidate Metal Matrix Materials Metal Electron-Phonon Coupling, λ Lead 1.55 Tin 0.72 NbTi 0.92 Niobium (Nb) 1.22 Mercury 1.62 Tantalum 0.69 Titanium 0.8 Vanadium 0.8 Indium 0.81 Ti_(0.9)Bi_(0.1) 0.78 Pb_(0.4)Ti_(0.6) 1.38 Pb_(0.9)Bi_(0.1) 1.66 Pb_(0.75)Bi_(0.25) 2.76 Pb_(0.7)Bi_(0.3) 2.01 Lead/Indium Alloys >1.5 Lead/Bismuth Alloys generally 2.3 Ga 2.25 Bi 2.45

Conductive materials useful for the metal matrix material are not necessarily limited to those listed in Table 2. Many of the metal matrix materials in Table 2 are elemental materials (e.g., Lead, Tin, Niobium). These elemental materials are typically Type I superconductors and generally are not suitable for use in high magnetic field applications. For high magnetic field applications, Type II superconductors (e.g., metal alloys) should be used for the metal matrix materials. Examples of Type II alloys are NbTi and Lead-Bismuth alloys. Also, it is known that some elemental metals act as Type II superconductors if under sufficient mechanical stress or in thin film form. Stressed Niobium, for example, acts as a Type II superconductor and can be used as a metal matrix material in high magnetic field applications, though well annealed, unstressed niobium is a classic Type I superconductor. Also, Gallium and Bismuth exhibit superconducting properties in high magnetic fields (i.e., Type II behavior) when the materials are prepared in confined geometries such as in thin film form or within narrow pores in porous glass. These confined geometries of the metal matrix form naturally in the superconductor/metal matrix composite materials upon densification of the superconductor particles and metal matrix material (in powder or liquid form) due to the ductile nature of the metal material and the hard, brittle nature of the superconductor particles.

Also, the metal matrix material preferably has a long proximity effect decay length and inelastic mean free path. The proximity effect decay length is a fundamental material property. The decay length is a result of dephasing of electron and hole wave functions as they travel through the matrix material (due to different electron and hole velocities). It is noted that the proximity effect decay length is inversely proportional to absolute temperature, and depends on the energy of the electron (or hole) with respect to the Fermi energy. In the thermal limit, k_(B)T˜Δ, (where Δ is the superconducting gap magnitude of the brittle superconductor particle) and the proximity effect decay length is given by the well-known expression, K⁻¹=hv_(F)/(4π²k_(B)T). In this expression, h is Planck's constant, v_(F) is the Fermi velocity of the metal matrix, k_(B) is Boltzmann's constant and T is the temperature. For k_(B)T less than Δ (at temperatures less than Tc, for example), the proximity effect decay length is energy dependent and can be written as K⁻¹=(hv_(F)L/6π²ε)^(0.5), where L is the inelastic mean free path of the electrons (holes) in the metal matrix and ε is the excitation energy of the electrons (holes) in the metal matrix measured with respect to the Fermi energy. Thus, the proximity effect decay length diverges for electron (hole) excitations near the Fermi surface (e.g., when ε is very near zero) and may, in fact, be much larger than the thermal limit of the proximity effect decay length at these temperatures. These proximity effect decay length expressions are valid in the so-called “clean limit” where L is very large (i.e., larger than the thermal proximity effect decay length), equivalent expressions may be obtained in the “dirty limit” which is characterized by short inelastic mean free paths. Preferably, the inelastic mean free path is greater than the thermal proximity effect decay length at temperatures below the Tc of the brittle superconductor particles. The inelastic mean free path L is also a fundamental material property, though the magnitude of the inelastic free path may vary considerably at temperatures below 10K due to the effect of impurity scattering at these temperatures. The inelastic mean free path is the length over which electrons (or holes) in the material travel on average before scattering inelastically and thus losing phase coherence. Preferably the metal matrix material will have large inelastic mean free paths. Most preferably, the inelastic mean free path of the metal matrix will be larger than the average spacing between the brittle superconductor particles in the composite. It is noted that the inelastic mean free path increases dramatically with decreasing temperature. In general, the inelastic mean free path increases as the resistivity of the material decreases. Approximate values may be obtained for metallic materials from the resistivity and the Fermi velocity of the metal. An exception to this is Bismuth, which is a semimetal with a low carrier density and possesses an unusually long inelastic mean free path (discussed below). Table 3 shows thermal proximity effect decay lengths (e.g., evaluated at energy k_(B)T) and inelastic mean free paths for selected candidate materials at 20K.

TABLE 3 Decay Lengths for Selected Matrix Materials Inelastic Mean Free Thermal Decay Length Metal Path at 20 K in nm at 20 K in nm Lead 87 111 Tin 450 116 NbTi ~100 ~83 Nb 1082 83 Mercury 53 96 Gallium 490 117 Bismuth >>2000 114 Indium 335 106 Lead/Bismuth Alloys ~20 ~90

The superconductor particles 22 preferably have a critical temperature higher than the critical temperature of the metal matrix material 24.

FIG. 2 shows a diagram illustrating the superconducting proximity effect as it occurs at a boundary 27 between a superconductor 26 and a metal 28 susceptible to the proximity effect. A superconducting gap magnitude provides a measure of superconductivity. The superconducting gap magnitude is proportional to the critical temperature and the critical current density in a superconducting material. In the metal the gap magnitude 29 is relatively high close to the boundary 27, and decreases with distance from the boundary. The metal 28 is superconducting close to the boundary 27 due to contact with the superconductor 26. The superconducting gap magnitude in the metal decreases with increasing distance from the boundary 27. The characteristic length of the decay of the superconducting gap magnitude in the metal is the proximity effect decay length. FIG. 2 shows calculations of the superconducting gap magnitude in the metal in the thermal limit. Low energy excitations of electrons (holes) in the metal may extend far beyond this minimum value, as discussed previously.

FIG. 3 shows a diagram illustrating the superconducting gap magnitude in the case where the metal has a low electron-phonon coupling coefficient (λ less than 0.2). The gap magnitude 29 in the metal is relatively small, and therefore the metal has relatively small critical current density. The metal has poor superconducting properties due to the low λ value. Examples of materials with low λ include silver with λ=0.14, gold with λ=0.14, and copper with λ=0.08. These materials are very good conductors, but have poor superconducting properties. Therefore, they are preferably not used as the metal matrix material.

FIG. 4 shows a diagram illustrating the superconducting gap magnitude in the case where the metal has a high electron-phonon coupling coefficient (λ greater than 1.0). The gap magnitude 29 in the metal is relatively large compared to the gap magnitude in FIG. 3. The high λ results in the metal having a larger critical current density extending deeper into the metal layer. The proximity decay length of the metal also plays a role. FIG. 4 shows calculations of the superconducting gap magnitude in the metal in the thermal limit. Low energy excitations of electrons (holes) in the metal may extend far beyond this minimum value.

In the present invention (e.g., the embodiment shown in FIG. 1), the superconductor particles 22 are superconducting at the operating temperature, and the metal matrix material is induced superconducting through the superconducting proximity effect, even though its superconducting transition temperature may be below the operating temperature. FIG. 5 shows a single isolated superconductor particle 32 disposed in a block 34 of metal matrix material. When cooled below the critical temperature of the particle 32 (but not necessarily below the critical temperature of the metal matrix material block 34), the superconductor particle 32 causes portions of the block close to the superconductor particle to become superconducting due to the proximity effect. Circle 36 illustrates the approximate range of the proximity effect. The circle 36 is relatively large if the metal matrix material has a high λ value, long proximity decay length, and long inelastic mean free path; the circle is relatively small if the metal matrix material has a small λ value and/or short proximity decay length and/or short inelastic mean free path. If the metal matrix material block is made of silver, gold, or copper, for example, the circle 36 will extend only a very small distance beyond the surface of the superconductor particle and the block will have essentially no useful superconductivity.

FIG. 6 shows an idealized embodiment of the present invention in which all the superconductor particles 22 are arranged linearly in the metal matrix material 34. Circles 36 illustrate the approximate range of the superconducting proximity effect within which superconducting gap has a magnitude great enough to provide a useful critical current density. The particles 22 are close enough so that the circles imply that the particles 50 are coupled by a continuous superconducting path due to the proximity effect. The path 38 can pass through the superconductor particles 22 and the superconducting regions of the metal matrix, or can pass only through the superconducting regions of the metal matrix material 34. Very large superconductor particles are usually not preferred due to the formation of large interstitial domains of metal matrix material which have dimensions larger than the range of the proximity effect (i.e., much larger than the inelastic mean free path). Thus, these large regions of interstitial metal matrix material are not substantially induced to the superconducting state. Generally, the superconductor particles are preferably small enough and numerous enough so that substantially all the metal matrix material is affected by the proximity effect. Of course, the optimum size of the superconductor particles depends somewhat on the volume percent of superconductor particle material versus matrix material, and the temperature at which the composite material is used.

In FIG. 1, the superconductor particles 22 are close enough and numerous enough so that essentially the entire volume of the metal matrix material is induced into a superconducting state by the proximity effect when cooled below the critical temperature of the superconductor particles 22. Therefore, the entire volume of the composite material is superconducting when cooled below the critical temperature of the superconductor particles 22. FIG. 1 shows an idealized composite material and actual materials will contain some fraction of void volume within the composite. Also, some fraction of the brittle superconductor particles will necessarily be in good contact with each other and thus will support a supercurrent through the superconductor/superconductor interface.

An important consideration in the present invention is the relative volume of the superconductor particles and the metal matrix material. The optimal percentages (measured by volume) of superconductor particles and metal matrix material depends greatly on the mechanical and superconducting properties of the materials used, and the desired mechanical and superconducting properties of the composite material. For example, if very high ductility is desired of the composite material, then a high percentage of the very ductile metal matrix material should be used. Generally, the optimal volume percent of metal matrix material increases with increasing λ.

Also, the temperature at which the composite is to be used has bearing on the composite design. The proximity effect decay length increases with decreasing temperature. Therefore, for a composite used at very low temperatures, the superconductor particles 22 can be located relatively far apart. If the composite is to be used at relatively high temperatures, then the superconductor particles 22 are preferably located relatively close together. Interparticle spacing and average superconductor particle size will determine the approximate volume percentage of metal matrix material in the composite. For example, the percent volume metal matrix in a composite will increase as the average particle size of the superconductor particles decreases with a fixed distance maintained between the superconductor particles.

There are many possible combinations (e.g., thousands) of superconductor particle materials and metal matrix materials within the scope of the present invention. Each possible combination may also be improved or optimized by selecting the best superconductor particle volume/matrix material volume ratio. Also, each material combination may be improved or optimized by selecting the best size range for the superconductor particles. Further, there may be special chemical compatibility issues for certain combinations for superconductor particle materials and metal matrix materials. In general, chemical reactivity between the particles and metal matrix material should be avoided, particularly if the reactivity is destructive to the superconducting properties of the superconductor particles, or if the reactivity is destructive to the superconducting properties of the metal matrix material, or if the reactivity degrades the electrical contact between the superconductor particles and the metal matrix (e.g., by producing an insulating layer at the particle/matrix interface).

FIG. 7 shows critical current densities for several different material combinations at 4.2K. The different material combinations are Nb3Sn superconductor particles dispersed within silver, aluminum, indium and lead. A cross 40 represents the critical current density for pure compacted Nb3Sn superconductor particles (e.g., a powder-in-tube Nb3Sn wire). In all the composites represented in FIG. 7, the Nb3Sn superconducting particles were −325 mesh, which corresponds to particle sizes in the range of about 1-40 microns. The critical current density was determined by the standard 0.1 μV/cm electric field criterion. It is possible the critical current densities of the composites could be improved by using superconductor particles with well defined particle sizes (e.g., mono-disperse or bimodal particle size distributions). For example, extremely large superconductor particles within the filament may impede supercurrent flow in powder-in-tube wire, if the large superconductor particle has an average diameter on the order of the filament diameter of the powder-in-tube wire.

FIG. 7 demonstrates that a composite of Nb3Sn particles in a silver matrix has a dramatically reduced supercurrent carrying capacity compared to pure compressed Nb3Sn particles. This is because silver has a very low λ and is therefore only very weakly susceptible to the superconducting proximity effect.

Similarly, the composite material which consists of Nb3Sn superconductor particles embedded in an aluminum matrix has a reduced Jc relative to the pure Nb3Sn particles because aluminum has a relatively low λ of 0.43. However, the composite which consists of Nb3Sn superconductor particles embedded in an indium matrix has an improved Jc relative to pure Nb3Sn, Nb3Sn/silver, or Nb3Sn/aluminum materials. FIG. 7 indicated that the optimum amount of indium is about 10-35% by volume. Indium improves the Jc of the composite because indium, with a λ of 0.81, has relatively high susceptibility to the superconducting proximity effect. Similarly, lead also improves the Jc of the composite because lead, with a λ of 1.55, also has a high susceptibility to the superconducting proximity effect. However, embedding the Nb3Sn superconductor particles in the lead matrix does not improve the Jc as much as would be expected from its λ value. This is because the tin (Sn) within the Nb3Sn tends to offset the Jc improvement provided by the high λ of lead. This effect of chemical reactivity is worsened by heating the composite material. Several possibilities for avoiding this effect are discussed below.

FIG. 8 shows critical temperatures (Tcs) for some of the same composite materials plotted in FIG. 7. Bulk Nb3Sn has a bulk Tc of 18K. However, the resistive Tc of pure compacted Nb3Sn powder is about 10K, which is indicated in the graph at 42. This low value for Tc reflects the poor inter-particle contact between the Nb3Sn superconductor particles in a compacted material. FIG. 8 shows that the addition of silver or aluminum to Nb3Sn particles dramatically decreases the Tc compared to pure compacted Nb3Sn particles. Aluminum has a Tc of 1.4K and silver is not superconducting at any temperature. By comparison, indium, which has Tc of 3.2K dramatically increases the Tc of the Nb3Sn/indium composite to over 10K. This is a striking result considering that Indium has a Tc less than 10K. Indium increases the Tc of the composite because indium has a relatively high λ of 0.81 and is thus quite susceptible to the superconducting proximity effect. Similarly, lead increases the Tc of the Nb3Sn/lead composite because lead has a λ=1.55. The effect of the high λ of lead is offset due to the chemical reactivity between lead and Nb3Sn. It is expected that further increases in the critical temperature of Nb3Sn/lead composites would be realized if not for the dissociation of tin from Nb3Sn when in the presence of lead.

The composites of the present invention can be adjusted to have desired ‘n-values’. FIG. 9 illustrates the concept of an n-value as is known in the art. The n-value of superconducting material describes the sharpness of the conversion to the normal state when the critical current density is exceeded. Generally, the n-value is defined by the relation: V/Vc=(I/Ic)n,

where I and V are the current and voltage in the wire. Vc is the electric field criterion standard (typically 0.1 μV/cm or 1 μV/cm), and Ic is the critical current of the composite which is defined as the magnitude of current passing through the wire which results in an electric field of at least Vc/cm existing in the wire. An n-value of 1 corresponds to Ohms Law for a normal resistive metal. The n-value can be an important characteristic for certain superconductor applications. For example, in fault-current limiters for electrical power distribution application, it is highly desirable to have a very high n-value so that power surges are efficiently attenuated. Such devices are operated very close to Ic. A current surge exceeds Ic and pushes the device into normal conduction, thereby absorbing the power surge. The present invention can provide a composite for fault current limiters that have a very high n-value with the proper choice of superconductor particles, metal matrix, and volume percentage metal matrix in the composite. Conversely, superconducting wire for electric motors should have a relatively low n-value so that large, sudden changes in motor impedance are not produced by current surges and so that changes in motor load do not result in current surges. The present invention provides flexibility so that specific n-values can be provided for specific applications.

FIG. 10 plots n-values for several Nb3Sn/metal matrix composites made with silver, aluminum, indium and lead matrix materials. The n-value for a pure compressed Nb3Sn superconductor particles is about 10 for these particular wires. Embedding Nb3Sn superconductor particles in a matrix of silver or aluminum reduces the n-value compared to pure compressed Nb3Sn particles. Embedding Nb3Sn superconductor particles in a matrix of 10-35% indium by volume increases the n-value. Embedding Nb3Sn superconductor particles in a matrix of lead increases the n-value. The n-value for lead is measured to be about 70. The measured n-values for Nb3Sn/lead composites are not consistent because of variations caused by the reactivity between the Nb3Sn and lead. Since silver, aluminum, indium and lead have different effect on the n-value, a desired n-value can be produced by using a combination (mixture) of these metals for the matrix material. For example, a combination of lead and silver will produce a wire having a reduced n-value compared to a wire with a matrix of pure lead. By selecting appropriate ratios of different metal matrix materials, a desired n-value is provided. Also, the n-value of a particular superconductor/metal combination is a function of volume percentage of the metal matrix in the composite for a given superconductor particle size distribution. In general, n-values increase as Jc increases.

FIG. 11 shows a graph of the normalized electron-boson coupling constant versus critical current density. The normalized electron-boson coupling constant includes the effect of the screened electron-electron Coulomb repulsion μ*. For most materials, the screened electron-electron Coulomb repulsion is about 0.1.

The normalized electron-boson coupling constant is given by (λ−μ*)/(1+λ).

The normalized electron-boson coupling constant is proportional to the superconducting gap magnitude in a metal adjacent to a superconductor and therefore is a more accurate measure of proximity effect susceptibility than the electron-boson coupling coefficient λ. The normalized electron-boson coupling constant values for silver, aluminum, indium, and lead are about 0.03, 0.19, 0.38 and 0.55, respectively. FIG. 11 illustrates that Jc increases strongly with increasing λ and normalized electron-boson coupling constant. These results suggest that very high λ materials such as lead-bismuth alloys, gallium and bismuth will provide very high Jc's which may significantly exceed 100 kA/cm2 if added to the composite in sufficient quantity. Also, these results suggest that, if all other factors are constant, higher normalized electron-boson coupling constants are always better.

FIG. 11 also demonstrates that too much matrix material strongly reduces the Jc of the composite material unless the normalized electron-boson coupling is very high and the inelastic mean free path is very long. For matrix materials with λ in the range of about 1.5-3, and superconductor particles with a distribution of particles less than approximately 40 microns in diameter (−325 mesh), it is estimated that the matrix material should comprise about 10-50% of the composite by volume. Different superconductor particle size distributions may result in the optimum volume percentage of matrix metal in the composite to differ from these values.

The reaction between lead and Nb3Sn causes degradation of the superconducting properties of Nb3Sn/lead composites. Also, the superconducting properties are unstable and may deteriorate when the composite is exposed to heat which promotes the reaction. Therefore, Nb3Sn/lead does not provide a good superconducting composite. As noted above, the tin dissociates from the Nb3Sn and dissolves in the lead.

Generally the A15 compounds tend to be somewhat unstable. If a component of the A15 compound is soluble in the matrix material or binds with the matrix material, then this can promote the dissociation of the A15 compound. For this reason it is best to use A15 compounds having constituents which are insoluble in the metal matrix material or have a low affinity for the metal matrix material. This helps prevent the A15 compound from dissociating and degrading the properties of the composite. For example, if lead is used as a matrix material, other A15 compounds not containing tin can be used.

MgB2 tends to lose magnesium metal from the superconductor particle surface at temperatures in excess of 500 C. Also, magnesium and boron may react with certain matrix metals forming resistive intermetallic or metal borides at the superconductor/metal interface at elevated temperatures. In general, MgB2 is not very reactive with many matrix metals at temperatures near room temperature.

Most generally, any chemical reactivity between the superconductor particles and metal matrix material should be avoided if it adversely effects the superconducting properties of the superconductor particles, the metal matrix materials, or electron (hole) transport through the superconductor particle/metal matrix interface. Any metal matrix material that promotes the chemical breakdown of the superconductor particles should be avoided, though as mentioned previously, a certain degree of reactivity can be tolerated. Lead is an example of the metal matrix material that promotes the chemical breakdown of Nb3Sn, yet the Nb3Sn/Pb composite still has a high Jc.

FIG. 12 shows an alternative embodiment of the present invention which uses Nb3Sn superconductor particles 46 and lead as the matrix material 48. Each Nb3Sn superconductor particle 46 has a thin metal film coating 44 which prevents chemical reactions from occurring between the Nb3Sn superconductor particles 46 and lead matrix material 48. The coating is chemically compatible with the particles 46 and is chemically compatible with the metal matrix material 48. The coating 44 can be made of many different materials but is preferably metallic and electrically conductive. The coating can be silver, for example. The coating 44 should be thin enough so that the proximity effect from the Nb3Sn superconductor particles 46 can reach the lead matrix material. This is preferably accomplished by making the coating 44 as thin as possible while still providing chemical isolation between the Nb3Sn superconductor particles and lead. More specifically, the coating should be substantially thinner than the inelastic electron mean free path (MFP) of the coating material at the temperature that composite material is used (e.g., the critical temperature of the particles). For silver, which does not react with Nb3Sn the MFP is greater than 2000 nanometers at 18 Kelvin, the Tc for Nb3Sn. More preferably, the coating thickness is less than 20% of the electron MFP at the Tc of the superconducting particles.

Preferably, the metal coating is thinner than an electron mean free path in the metal coating material at 4.2 Kelvin. Also, the metal coating is preferably thinner than a proximity effect decay length of the metal coating material at 4.2 Kelvin.

It is noted that metals with a long election MFP tend to have low λ values and are therefore are not susceptible to the proximity effect. Exceptions to this are metals such as gallium or bismuth, which have both high λ values and long MFPs. A long mean free path in the coating increases the ‘penetration’ of the proximity effect through the coating. A coating material with a high λ and short MFP will tend to reduce the proximity effect in the matrix, but in this case the coating itself will be more susceptible to the proximity effect. Generally, if a coating is applied to the superconductor particles, a balance is preferably provided between the coating thickness, inelastic mean free path, and λ value. For example, a very thick silver coating (much thicker than the silver MFP) would be undesirable because the silver is not susceptible to the proximity effect, and the silver coating would reduce the proximity effect in the matrix. In general, if low λ/high MFP coating is used, it should be as thin as possible while still preventing chemical reactions between the particles and matrix materials. For example, 5-10 nanometers of silver can be sufficient for preventing certain chemical reactions, and the MFP for silver is much greater than 10 nm at temperatures necessary for superconductivity. If a high/low MFP coating is used, the optimal thickness depends on the coating λ and the MFP, as well as the metal matrix material λ.

Table 4 shows several metals which can be used for a metal coating in cases where chemical incompatibility exists between the superconductor particles and the metal matrix material. As mentioned previously, the MFP increases with decreasing temperature. Also, the MFP depends upon the microstructure of the material and so may vary from the values shown (e.g., depending on the process used to make the coating). Coating materials useful for chemically protecting the superconductor particles from the metal matrix material are not necessarily limited to those listed in Table 4:

TABLE 4 Candidate Metal Coating Metals Metal Inelastic mean free path at 77 Kelvin Silver 285 nm Gold 205 nm Aluminum 131 nm Copper 328 nm Tin 100 nm Lead 141 nm

FIG. 13 shows experimental results for four composites having Nb3Sn superconductor particles coated with about 100 nanometers of silver. The coated superconductor particles are disposed in silver, aluminum, indium or lead matrix materials (the silver coating is not considered part of the matrix material). The Jc's for the four composites are indicated by X's. In each of the four composites, the silver coating comprises about 5% of the composite volume. The matrix material (silver, aluminum, indium, or lead) comprises about 15% of the composite volume. The silver coating prevents chemical reactions between the Nb3Sn superconductor particles. The important point here is the high-λ metals (e.g., indium, lead) increase the Jc of the composite compared to low-λ matrix materials. This is remarkable considering that the matrix is separated from the Nb3Sn particles by 100 nanometers of silver. The proximity effect extends through the silver coating. If the proximity effect did not extend through the 100 nm silver coating, the Jc for the indium and lead matrix composites would be the same as for the Nb3Sn/silver matrix composite or essentially zero (i.e., less than 10 A/cm2). The fact that indium and lead dramatically increase the Jc while not in direct physical contact with the superconductor particles is proof that the proximity effect extends through the silver coating. It is noted that the silver coating does negatively impact the wire performance somewhat. This negative impact is preferably minimized by reducing the thickness of the silver coating (e.g., to less than 120 nanometers). For example, a silver coating of 100 nanometers is unnecessarily thick, but can be used.

Prior to the development of the present invention, it was mistakenly assumed by many in the field of superconductivity that the proximity effect could not extend through a thin layer of low-λ metal (such as the noble metals in Table 4). FIG. 14 illustrates the prevailing but incorrect understanding of what was expected in such a ‘three-layer’ system. The superconductor 26 is separated from a high-λ metal 62 by a thin layer of low-λ metal 60. The low-λ metal has a very small superconducting gap magnitude in the high-λ metal. This model of the proximity effect in the three-layer system is absolutely incorrect.

FIG. 15 illustrates the correct model of the superconducting proximity effect in a three-layer system. Remarkably and surprisingly, the superconducting gap magnitude 66 rebounds in the high-λ metal to a value possibly much higher than the gap magnitude in the low-λ metal 60. The ability of the gap magnitude to rebound in a three-layer system has been confirmed in experiments performed by the present inventor. Of course, in order for the superconducting gap to rebound, the high-λ metal must have a λ substantially higher than the λ of the low-λ metal. The rebounding effect provides the physical basis of operation of the composite materials of the present invention which employ a low-λ metal coating surrounding of the superconductor particles. For example, it is the rebounding effect which provides the improved Jc in the composite material having silver-coated Nb3Sn superconductor particles in a lead matrix (explained with reference to FIGS. 12 and 13). It is important to note that the low-λ metal is minimized by making the low-λ coating as thin as possible, and by using a low-λ coating with a long MFP.

It is noted that, although the foregoing embodiments of the present invention have been primarily explained with reference to Nb3Sn as the superconductor particle material, the superconducting particles can be made of many other superconducting compounds and ceramics. Also, the superconducting particles can be made of a mixture of materials (i.e., each superconductor particles within the same composite can be made of different superconducting compounds or ceramics). The choice of superconductor particle material and matrix material is an important one, and depends upon the mechanical, electrical and chemical characteristics of the superconductor particles and matrix materials as well as the desired properties of the composite material (e.g., ductility, critical current density, n-value, critical temperature, chemical reactivity). For many material combination, optimal volume ratios and superconductor particle sizes (e.g., producing the highest Jc, the highest Tc, the highest/lowest n-value, highest ductility) can be found by routine experimentation using the guidance and teaching of the present description.

The composites of the foregoing embodiments are in the form of single filament wire and are simple to manufacture using powder-in-tube methods known in the art. First, a powder of superconducting particles is thoroughly mixed with a metal matrix material. The metal matrix material may be mixed in powder form with the superconductor particles, or with low melting temperature matrix metals, added to the superconductor particles in liquid form. In general, the average particle size of the metal matrix powder should be less than, or on the order of, the average particle size of the superconductor powder to achieve a well mixed composite. The mixing of the materials may be accomplished through a simple mechanical mixing or by other homogenizing techniques know in the art, such as ball milling, planetary milling or attrition milling. Mechanical homogenizing techniques may reduce the average particle size of both the superconductor particles and the metal matrix particles. Also, the ductile metal matrix particles will be severely deformed by these techniques and will cold weld to the superconductor particles, metal matrix particles, or superconductor particles with metal matrix material cold welded to the surface. The ductile metal matrix will tend to fill in the void spaces between the brittle superconductor particles during the densification processes involved in standard powder-in-tube conductor fabrication techniques. Alternatively, the superconductor particles may be substantially coated by a layer of matrix material using a number of coating techniques such as sputtering, evaporation, or electroless deposition. Each constituent material in the composition is preferably clean and free of contaminants. Preferably, the superconductor particles and matrix material are handled in an inert atmosphere. The mixture is placed within a billet such as a copper, silver, aluminum, nickel, iron or rubber tube, though any non-reactive tube will work also. If the brittle superconductor particles or the metal matrix material reacts with the sheath material in such a way as to reduce the superconducting properties of the composite, or degrade the mechanical properties of the final wire or tape, then a thin layer of material may be placed in between the sheath material and the superconductor composite material. This thin layer of material acts as a chemical buffer between the sheath and the composite. The insertion of a barrier layer to prevent unwanted reactions between the sheath material and the filament is well known in the art, particularly in the fabrication of Nb3Sn wire where a tantalum barrier layer is sometimes placed between the copper sheath and the Nb/Sn pre-reacted core filament to prevent excess diffusion of Sn into the copper sheath. Next, the powder mixture is compressed in the billet, for example using a small arbor press and a ram rod to compress the material inside the billet. The compression step removes the majority of the voids from the composite material, though complete elimination of the void volume is not necessary. Typically, well packed billets have initial packing densities between 60% and 95% of the maximum density. The compression step may be performed in vacuum so that the void volume is minimized. In general, higher filament packing densities result in higher critical currents in powder-in-tube superconducting wires. Next, the billet containing the well packed material is drawn in to a wire using known wire drawing techniques. Annealing steps may be required between the drawing steps. It is noted that the typical powder metallurgical techniques may leave voids comprising about 10-20% of the composite volume.

The relative volumes of the superconductor particles and metal matrix material is determined by the amount of the respective materials originally mixed together.

If it is desired to provide the superconductor particles with a noble metal coating (e.g., a silver coating), then this coating is preferably applied before mixing the superconductor particles with the metal matrix material. The coating can be applied using known chemical or physical deposition techniques.

An alternative method for making composite material begins by coating the superconductor particles with a coating of metal matrix material. The thickness of the coating is preferably controlled accurately. The interface between the superconductor particles and the metal matrix material coating is preferably clean and free of grease, oxides and any other insulating contaminants. Next, to form a wire from the composite material, the metal matrix coated superconductor particles are placed in the billet, compressed, and drawn into a wire. The relative volumes of the intrinsic superconductor particles and metal matrix material is determined by the size of the superconductor particles and the thickness of the metal matrix material coating. Of course, the composite material of the present invention can be made into any other shape such as bars, rods, sheets, or plates.

A very special set of embodiments of the present invention employ the high temperature superconductor (HTS) ceramic materials (HTS ceramics). In the present specification, HTS ceramics are defined as having a critical temperature greater than 30 Kelvin. Several examples of suitable HTS ceramics are given in Table 5. The HTS ceramic YBa2Cu3O7 is preferred for many applications (e.g., wire in high magnetic fields) because of its high flux pinning strength and high Tc.

TABLE 5 Ceramic Superconductors HTS Ceramic Critical Temperature, T_(C (K)) Bi₂Sr₂Ca₂Cu₃O₁₀ 105 Bi₂Sr₂CaCu₂O₈ 85 (BiPb)₂Sr₂Ca₂Cu₃O₁₀ 110 Tl₂Ba₂Ca₂Cu₃O₁₀ 125 HgBa₂CaCu₂O₆ 135 HgBa₂Ca₂Cu₂O₆ 135 Tl₂Ba₂CuO₆ 80 La_(1.8)Sr_(0.15)CuO₄ 40 YBa₂Cu₃O₇ 95 Tl₂Ba₂CaCu₂O₈ 105

The HTS ceramics listed above are strong oxidizing agents and will oxidize on contact all but the most noble (nonreactive) metals. Silver, gold, and palladium, for example, are not oxidized by contact with the HTS ceramics. However, these metals have very low electron-phonon coupling coefficients and are very poor proximity superconductors. Table 6 lists the electron-phonon coefficients for some noble metals not oxidized by the HTS ceramics.

TABLE 6 Electron-phonon Coefficients for Some Noble Metals Metal Electron-phonon coupling, λ Silver 0.14 Gold 0.14 Palladium <0.10 (approximate)

Generally, the noble metals have very low electron-phonon coupling coefficients. This explains why prior art composite superconductor wires made with HTS ceramic particles in a silver matrix have relatively low Jc values and are sensitive to mechanical stress. In these wires, the supercurrent tends to flow directly between HTS ceramic particles where there are small intergranular superconducting contacts between the particles. Consequently, supercurrent paths are disturbed when the material is flexed. Silver, gold, and palladium are very weakly susceptible to the proximity effect due to their very low λ values.

If HTS ceramic particles are disposed in a matrix of a non-noble metal (e.g., lead, indium, tin, NbTi or any other metals known to react with the HTS ceramics), an insulating metal oxide coating forms at the interface between the HTS ceramic particles and the non-noble metal. The metal oxide coating almost completely blocks the proximity effects and blocks supercurrent from flowing between adjacent HTS ceramic particles. A composite material having HTS ceramic particles in a matrix of oxidizable metal is almost completely useless as a superconductor due to the insulating metal oxide coating. The oxidizable non-noble metals cannot be combined with HTS ceramic particles in a composite material to make a useful superconducting composite employing the proximity effect.

FIG. 16 shows a view of a superconducting composite material according to the present invention that solves the above problems. The superconductor composite material has coated HTS ceramic particles 50 each having a noble metal coating 52. The coating 52 preferably completely surrounds each HTS ceramic particle 50. The noble metal coating 52 is preferably metallic and electrically conductive. The HTS ceramic particles 50 and coating 52 are disposed in a metal matrix material 54. The metal matrix material has a λ greater than 0.2, preferably greater than 0.5, more preferably greater than 1.0. All else being equal, the higher the λ of the metal matrix material, the better. The metal matrix material 54 is preferably selected from the materials listed in Table 2, although it is understood that Table 2 does not necessarily contain all the useful metal matrix materials. Any metal or metal alloy with a high enough λ, adequate ductility, long inelastic mean free path at the Tc of the superconductor particles, and compatible chemical properties is suitable for use as the metal matrix material.

The HTS ceramic particles preferably have dimensions (not including the coating 52) larger than the superconducting coherence length of the HTS ceramic material. Typically, HTS ceramic materials have coherence lengths of about 1.5-3 nanometers, so the HTS ceramic particles preferably are at least this large. The HTS ceramic particles have dimensions of about 5-500 nanometers. Preferably, the HTS ceramic particles have dimensions of about 3-1000 times the superconducting coherence length of the HTS ceramic, or more preferably, about 3-50 times the coherence length. The best size range depends upon the temperature at which the composite material is used, and the λ, the proximity effect decay length, and the inelastic mean free path of the metal matrix material, among other factors.

The noble coating 52 is preferably made of a noble metal that does not react (i.e., is not oxidized) by contact with the HTS ceramic particles. Preferably, the coating is made of silver, although other metals in Table 6 can be used, as well as alloys of these metals. The metal matrix can include alloys comprising metals not listed in Table 6. For example, alloys of silver or gold with relatively more reactive metals may be nonreactive with the HTS ceramic. The noble coating 52 serves to prevent chemical reactions (e.g., oxidation) from occurring between the HTS ceramic particles and the metal matrix material 54. The noble coating 52 should be as thin as possible while thick enough to prevent chemical reactions between the HTS ceramic particles and metal matrix material 54. Preferably the noble coating is about 5-50 nanometers thick, but the noble metal coating can also be as thick as 3000 nanometers. Thick noble coatings negatively impact or adversely affect the superconducting properties (e.g., Jc, Tc) of the composite superconducting material.

Silver is the preferred noble metal because it is the least expensive of the metals not oxidized by contact with HTS ceramics. Silver is also preferred because silver oxide is unstable at the modest temperatures used to anneal the HTS ceramic material, further inhibiting the formation and persistence of an oxide layer.

Also, silver is permeable to oxygen at elevated temperature. This is beneficial because the HTS ceramics require a high oxygen content for superconductivity. If oxygen is depleted from the HTS ceramic material, superconductivity is degraded. HTS ceramic particles coated with silver can be replenished with oxygen because silver is permeable to oxygen at elevated temperature. The oxygen content of coated HTS ceramic particles is restored by heating the coated particles in an oxygen atmosphere, as is well known in the art.

Preferably, the noble metal coating is thinner than the inelastic electron (hole) mean free path in the noble metal at the critical temperature of the superconducting particles. More preferably, the metal coating is 20% of the electron mean free path of the coating at the critical temperature of the superconducting particles.

A long MFP allows electrons and holes from the HTS ceramic particles to travel a long distance in the noble metal. This increases the probability that electrons and holes will reach the metal matrix material without collisions and thereby provide a substantial superconducting gap magnitude in the metal matrix material. Silver is also preferred because of its relatively long MFP. Again, it is emphasized that the noble metal coating should be as thin as possible while still providing chemical isolation for the HTS ceramic particles.

Also, it is preferable for the noble metal coating to be thinner than the proximity effect decay length of the noble metal at the critical temperature of the superconducting particles. Proximity effect decay lengths are typically shorter than the MFP for noble metals, and the proximity effect decay length is inversely proportional temperature. The proximity effect decay length is determined by the rate of dephasing of electron and electron-hole wave functions in the noble metal. The dephasing is caused by differences in the electron and hole velocities. The proximity effect decay length is known and understood in the art. Table 7 gives the thermal proximity effect decay lengths for some noble metals 77 Kelvin. As discussed previously, the actual proximity effect decay length diverges for electron (hole) excitations near the Fermi surface and may extend many times that of the thermal decay lengths shown in Table 7.

TABLE 7 Proximity Effect Decay Lengths for Some Noble Metals Noble Metal Proximity effect decay length at 77 K Silver 22 nm Gold 22 nm Palladium 27 nm

FIG. 17 illustrates the operation of the embodiments employing HTS ceramic particles 50 with a noble metal coating 54. When cooled below the HTS ceramic Tc, a proximity effect extends into the metal matrix material 52 a certain range illustrated by the circles 36. It is understood that the proximity effect extends through the noble metal coating 54 and into the metal matrix material 52 according to the model explained with reference to FIG. 15. The superconducting gap rebounds in the metal matrix material 52. The proximity effect decays with distance from the HTS particles 50 so that the circles provide an arbitrary measurement of the proximity effect range. The particles 50 are close enough together so that the circles 36 overlap, thereby providing a continuous supercurrent path 38. The overlapping circles means that the particles 50 are coupled by the continuous superconducting path due to the proximity effect. Circle size increases with decreasing noble metal coating thickness.

A method for preparing the HTS ceramic composite superconductor material begins with providing clean HTS ceramic particles of appropriate sizes. The HTS ceramic particles are then coated with a thin uniform coating of noble metal, preferably silver. Silver can be deposited using a number of techniques known in the art such as chemical deposition and vapor deposition. Vapor deposition can be performed by sifting the particles in a vacuum chamber having a partial pressure of silver, for example. Other techniques for forming the noble metal coating are known in the art.

After the HTS ceramic particles are coated with silver, the interior of the HTS ceramic particles can be replenished with oxygen. Replenishment is performed by heating the coated particles in an atmosphere with a partial pressure of oxygen. Since silver is permeable to oxygen at elevated temperatures (300° C. and up), oxygen reaches the ceramic. The best temperature, oxygen pressure, and annealing time is specific to each HTS ceramic and is selected to optimize the superconducting properties of each ceramic. Such annealing techniques for silver coated high Tc ceramics are well known in art. The coated HTS ceramic particles are then thoroughly mixed with particles of the metal matrix material. The ratio of HTS ceramic particles to metal matrix material particles determines the average spacing between the HTS ceramic particles. The mixing ratio has a large effect upon the superconducting properties of the composite material and should be optimized for a particular application. To form the composite into a wire, the mixture is then disposed in a metal billet and compressed to fuse the mixture into a densely packed composite material. Compression may be performed under vacuum so that void space is minimized. The densely packed composite material is then drawn into a wire using conventional techniques. Of course, the ceramic particles and metal matrix particles can be compressed to form any other shape such as bars, rods, sheets, or plates.

Alternatively, the coated HTS ceramic particles are coated with the metal matrix material. The twice coated HTS ceramic particles are then compressed in a billet and drawn into a wire.

The present invention provides a new class of superconducting composite materials that are designed to maximize the superconducting proximity effect. The metal matrix material is selected based on its electron-phonon coupling coefficient λ, its inelastic mean free path, and its chemical compatibility. In cases where a chemical incompatibility exists between the intrinsic superconductor particles and the metal matrix material (as in the case of the HTS ceramics and the Nb3 Sn/lead combination), a noble metal coating protects the superconductor particles. In the case of the HTS ceramics, the metal coating is preferably a noble metal coating that resists oxidation. For many other superconductor particles, the coating can be any metal compatible with other materials in the composite. If the metal coating is thin enough, and has a long enough inelastic mean free path, the proximity effect causes the surrounding metal matrix material to become superconducting due to the proximity effect.

It is noted that the present invention includes many possible combinations of superconductor particles materials and metal matrix materials. Any superconductor particles can be combined with any high-λ metal matrix material. If a chemical incompatibility exists in the combination (e.g., the combination causes degradation of the superconductor particles or degradation of the metal matrix material, or an insulating coating forms at the superconductor particle/metal matrix interface), then a chemically-insulating, electrically conductive coating should be provided between the superconductor particles and the metal matrix material. The coating is preferably a noble metal if the ceramic particles are highly reactive, such as many of the HTS ceramics.

For superconductor particle materials that are less reactive than the HTS ceramics, the coating can be made of high λ metals that are readily oxidizable by the HTS ceramics. However, the coating is preferably non-reactive with the superconductor particles and the metal matrix material.

The present invention is not limited to the superconductor particle material and metal matrix materials listed herein.

It is not necessary in the present invention to only select materials that do not react at all with one another. A certain amount of reactivity can be tolerated between the different components if the reactivity does not significantly damage the superconducting properties of the composite. For example, Nb3Sn/lead composite demonstrates some amount of damaging reactivity, but, Nb3Sn/lead composite is still useful as a superconductor for certain applications and is within the scope of the present invention. The present invention covers any material combinations that do not destroy superconductivity in one of the material components, or does not form electrically insulating layers (e.g., metal oxides) at interfaces between the components.

Wire Manufacture

FIG. 18 to FIG. 25 illustrate how the materials hereinbefore described can be used in manufacturing a three-component wire, according to an embodiment of the invention.

Referring firstly to FIG. 18, a sheet 100 of ductile protective material is provided on which superconductor particles 102 are deposited. The sheet 100 may for example be made of any one of the materials listed in Table 3. The sheet 100 is initially relatively thick for ease of handling and to prevent tearing thereof. The sheet 100 may, for example, be made of silver having a thickness of about 0.05 mm.

The superconductor particles 102 are in granular form and can be made of any one of the HTS materials listed in Table 5.

As shown in FIG. 19, the superconductor particles 102 are spread evenly over a surface provided by the sheet 100. In FIG. 20, another sheet 104 of the same material as the sheet 100 is located over the superconductor particles 102. The sheet 104 typically has the same thickness as the sheet 100. The superconductor particles 102 are thereby located between the sheets 100 and 104 of protective material.

Next, as shown in FIG. 21, a sheet 106 of ductile conductive material is located on the sheet 104 of protective material 104. The sheet 106 may be made of any one of the materials in Table 2. The sheet of protective material 100, the superconductor particles 102, the sheet of protective material 104, and the sheet of conductive material 106 thereby form four layers of a composite sheet 110. The composite sheet 110 has a thickness 112, a width 114, and a length 116 (only a portion of which is shown). The thickness is typically about 1 cm, the length 112 about 1 m, and the width 114 about 20 cm.

The composite sheet 110 has a strip 118 at an edge thereof extending along the length 116 thereof. Another strip 120 is located next to the strip 118, also extending along the length 116, and a further strip 122 is located next to the strip 120, the strip 122 also extending along the length 116. The strip 118 is folded on to the strip 120. The strip 118 is thereby located on top of the strip 120. Folding of the strip 118 onto the strip 120 is allowed for due to ductility of the sheets 100, 104, and 106, and due to the superconductor particles 12 being in singulated granular form. The strip 118 is then folded onto the strip 122 so that the strip 118 is located between the strip 122 and the strip 120. The strips 118, 120, and 122 being folded or rolled onto one another are shown in FIG. 22. Once folded, the composite sheet 110 forms an elongate member 126 having a length 116, a height 128, and a width 130. The height 128 is about 4 cm and is substantially the same as the width 130. Because of folding of the composite sheet 110, the elongate member 126 has a height 118 and a width 130 which are smaller than the width 114 of the composite sheet 110. It should be understood that, although the composite sheet 110 is rolled in the embodiment described, other methods of forming the composite sheet 110 may provide a similar elongate member. The composite sheet 110 may for example, be fan-folded.

The components of the elongate member 126 are located relative to one another so that the superconductor particles 102 are located next to the conductive material 106 on one side thereof and located next to the conductive material 106 on opposing side thereof. The conductive material 106 on each side is separated from the superconductor particles 102 by a respective portion of either the sheet 100 of protective material or the sheet 104 of protective material.

FIG. 23 illustrates further processing of the elongate member 126 wherein the elongate member 126 is rolled into a wire 136. The elongate member 126 is rolled by rollers 138 and other known equipment which reduce the dimensions of the elongate member 126 with a corresponding increase in length thereof. FIG. 24 is a cross-section of the elongate member 126 and FIG. 25 is a cross-section of the wire 136. As mentioned previously, the sheets 100 and 104 are initially relatively thick. Once the dimensions of the elongate member 126 are reduced to form the wire 136, the sheets 100 and 104 also reduce in thickness. The thickness of the sheets 100 and 104 of the wire 136 are about ten times the decay length of the material thereof. The superconductor particles 102 can induce the conducting material 106 to a superconductive state through the sheet 100 or 104. The exemplary 1 m by 4 cm elongate member 126 may for example be drawn into wire 136 having a diameter of 1 mm, a length of 1.6 km and have sheets 100 and 104 of silver that are reduced to 0.05 mm in thickness.

FIG. 26 is a cross-sectional view on 26-26 of FIG. 25. It can be seen that the sheets 100, 104, and 106, and the superconductor particles extend continuously through the wire 136. FIG. 26 only shows a section of the wire 136 but it should be understood that the wire 136 may be kilometers long with a continuous construction as shown in FIG. 26. It should, in particular, be noted that the conductive material 106 extends through continuous kilometers of the wire 136.

A respective superconductor particle 102A induces a region of the conductive material 140A to a superconductive state through the sheet 100. Another superconductor particle 102B induces another region 140B in this conductive material 106 to a superconductive state. The region 140B overlaps the region 140A, thereby providing a superconductive link from the region 140A to the region 140B. In a similar manner, another superconductor particle 102C induces another region 104C of the conductive material 106 to a superconductive state, and subsequent regions are also induced to a superconductive state. The regions overlap one another so that an unbroken superconductive path in the conductive material 106 is provided through the entire length of the wire 136. The wire 136 can thus conduct current in a superconductive nature when the wire 136 is cooled to an appropriate temperature wherein the superconductor particles 102 are superconductive.

The embodiment described with reference to FIG. 18 to FIG. 26 is for a three-component wire including (i) an HTS superconductor material from Table 5, (ii) a conductive material from Table 2, and (iii) a sheet of protective material from Table 3 located between the HTS superconductor material and the conductive material. Such a wire allows for the proximity effect to be employed utilizing a reactive or brittle HTS superconductor material.

In another embodiment an intrinsic superconductor material from Table 1 can be used together with a conductive material from Table 2. The intrinsic superconductor materials of Table 1 have the advantage that they are not as reactive as HTS superconductor materials, so that a wire embodiment of an intrinsic superconductor material and a conductive material can be formed without a sheet of protective material between the intrinsic superconductor material and the conductive material. Such a wire is shown in FIG. 27 and can be formed by spreading particles 182 of brittle superconductor material over a sheet 184 of ductile conductive material and then folding or rolling the sheet 184 of conductive material into an elongate member so that the particles 182 of superconductor material are trapped between successive layers of the sheet 184 of ductile material, whereafter the elongate member is drawn into the wire 180. The wire 180 requires fewer components while still having a conductive material with an electron-phonon coupling coefficient of at least 0.2.

FIG. 28 is a cross section on 28-28 in FIG. 27. It can be seen from FIG. 28 that the particles 182 of superconductor material are located directly against the sheet 184 of conductive material. The conductive material of the sheet 184 is driven to a superconductive state by the superconductor particles 182 without a protective sheet located between the particles 182 and the sheet 184.

FIG. 29 to FIG. 37 now illustrate three different embodiments of making three-component powder-in-tube wire from the HTS materials listed in Table 5, the protective materials listed in Table 3, and the conductive materials listed in Table 2, and FIG. 38 to FIG. 43 illustrate two embodiments of making a two-component powder-in-tube wire utilizing the intrinsic superconductor materials of Table 1 and the conductive materials of Table 2.

The first embodiment of making a three-component powder-in-tube wire is shown in FIG. 29 to FIG. 31. FIG. 29 shows one granule 200 that is used in the manufacture of the wire. The granule 200 includes a superconductor particle 202, a layer of protective material 204, and a layer of conductive material 206. The superconductor particle 202 may be made of any one of the materials in Table 5. The layer 204 is formed directly on the superconductor particle 202 and entirely surrounds the superconductor particle 202. The layer 204 may be made of any one of the materials in Table 3. A layer 206 is formed directly on and entirely surrounds the layer 204. The layer 206 may be made of any one of the materials in Table 2.

FIG. 30 illustrates an elongate member 208 that is used for rolling wire out of. The elongate member has a circular pipe container 210 that is filled with a plurality of the granules 200. End caps 212 close off opposing ends of the pipe container 210. The elongate member 208 has a length 214, a width 216, and a height into the paper. The height and the width substantially equal one another. The layers 206 of conductive material of the granules 200 contact one another when located within the pipe container 210. The elongate member 208 is drawn in to a wire in a manner similar to that shown in FIG. 23. Drawing of the elongate member 208 into wire causes a reduction in the width 216 and the height with a corresponding increase in the length 214. The elongate member 208 initially has dimensions similar to the elongate member 126 in FIG. 22 and drawn into wire having dimensions similar to the wire 136 of FIG. 25.

FIG. 31 illustrates a core of wire 212 that is drawn out of the elongate member 208. The layers 206 of the granules 200 of FIG. 29 are deformed so that they fill regions between the superconductor particles 202. What remains of the initial granules 200 are a plurality of coated particles 214 with each coated particle 214 including a respective superconductor particle 202 and a respective layer 204 of protective material. The layers 206 of conductive material forms a matrix 206A filling regions between the coated particles 214. Deformation of the conductive layer 206 is allowed for due to ductility of the material that they are made of. A respective superconductor particle 202 induces or drives a respective region of the matrix material 206A surrounding the respective superconductor particle 202 to a superconductive state. A respective region given to a superconductive state by one of the superconductor particles 202 overlaps another region given to a superconductive state by another superconductor particle 202 so that a superconductive link is created from the one region to a next region. These regions overlap one another along an entire length 218 of the wire 212. A continuous chain of regions that are driven to a superconductive state is thereby created along the entire length 218 of the wire 212, which may be kilometers long.

FIG. 32 to FIG. 34 illustrate a second embodiment of making a three-component powder-in-tube wire according to the invention. FIG. 32 illustrates a granule 230 including a superconductor particle 232 and a layer 234 of protective material. The superconductor particle 232 is made of a material from Table 5 and the layer 234 is made of a material from Table 3. FIG. 33 shows an elongate member 236 assembled from an elongate pipe container 238 with a plurality of the granules 230 therein. Opposing ends of the pipe container 238 are closed with end caps 240. The pipe container 238 is made of a material from Table 2.

FIG. 34 illustrates a portion of a wire 242 that is drawn from the elongate member 236. The material of the protective layers 234 of the granules 238 is sufficiently ductile so as to deform into a matrix 234A that fills spaces between the superconductor particles 232. The pipe container 238 is also sufficiently ductile so as to deform into a casing 238A that entirely surrounds the matrix material 234A and the superconductor particles 232. The superconductor particles 232 located closest to an inner wall of the casing 238A are spaced from the inner wall of the casing 238A by a respective portion of the matrix 234. The superconductor particles 234 are, however, sufficiently close to the casing 238A so as to drive respective regions of the material of the casing 238A to a superconductive state. These regions overlap one another so as to form a continuous chain of superconductive regions extending throughout the wire 242.

FIG. 35 to FIG. 37 illustrate a third embodiment of making a three-component powder-in-tube wire according to the invention. As shown in FIG. 35, granules of superconductor particles 260 are used but are uncoated, i.e., having all external surfaces exposed. FIG. 36 illustrates an elongate member 260 including an external pipe container 264 of conductive material, an inner container 266, a plurality of the granules 260, and end caps 268. In this embodiment, the outer pipe container 264 is made of a conductive material from Table 2 and the inner pipe container 266 is made of protective material from Table 3. The inner pipe container 266 is located within the outer pipe container 264 as to form a layer covering an entire inner surface of the outer pipe container 264. The superconductor particles 260 are then inserted within the inner pipe container 266. The superconductor particles 260 are entirely surrounded by the inner pipe container 266 and the inner pipe container 266 is entirely surrounded by the outer pipe container 264. The end caps 268 are located over opposing ends of the pipe containers 264 and 266. The exposed surfaces of the superconductor particles 260 contact one another and some of the exposed surfaces contact an inner surface of the inner pipe container 266.

FIG. 37 illustrates a section of a wire 272 that is drawn from the elongate member 262. The thicknesses of the pipe containers 264 and 266 are reduced to form elongate casings 264A and 266A respectively. Some of the superconductor particles 260 contact the elongate casing 266A but are prevented from contacting or reacting with the elongate casing 264A. The elongate casing 264A has a wall thickness that is sufficiently thin that a respective one of the superconductor particles 260 can induce a region of the material of the elongate casing 264A to a superconductive state. These regions are linked in a chain throughout the entire length of the wire 272.

FIG. 38 to FIG. 40 illustrate a first embodiment of making a two-component powder-in-tube wire utilizing an intrinsic superconductor from Table 1 together with a conductive material from Table 2. FIG. 38 illustrates a granule 300 which includes a superconductor particle 302 with a layer of conductive material 304 formed thereon. The superconductor particle 302 is made of an intrinsic superconductor material from Table 1 and the layer 304 is formed directly onto and entirely surrounds the superconductor particle 302 and is made of a conductive material from Table 2.

FIG. 39 shows an elongate member 304 including an elongate pipe container 308, a plurality of the granules 300 within the pipe container 308, and end caps 310 closing off ends of the pipe container 308. FIG. 40 illustrates a core of a wire 314 that is drawn out of the elongate member 306. The conductive material 304 is sufficiently ductile so as to deform and form a matrix 304A that fills regions between the superconductor particles 302. The superconductor particles 302 drive regions of the matrix 304A to a superconductive state and these regions are linked to form an unbroken chain throughout the entire length of the wire 314.

FIG. 41 to FIG. 43 illustrate a second embodiment of forming a two-component powder-in-tube wire from an intrinsic superconductor material from Table 1 and a conductive material from Table 2. FIG. 41 illustrates superconductor particles 320 that are uncoated, i.e., having bare outer surfaces. As shown in FIG. 42, the superconductor particles 320 are located within an elongate pipe container 322 and ends of the elongate pipe container 322 are closed off with end caps 324 to complete assembly of an elongate member 326. In this embodiment, the elongate pipe container 322 is made of a conductive material from Table 2 and the superconductor particles 320 are made from an intrinsic superconductor material from Table 1.

FIG. 43 illustrates a section of a wire 332 that is drawn from the elongate member 326. The elongate pipe container 322 reduces in thickness to form an elongate casing 322A with the superconductor particles 320 therein. The superconductor particles 320 drive regions of the material of the elongate casing 322A to a superconductive state.

Magnesium Diboride as a Superconductor Material

It has been found that magnesium diboride (MgB2) displays superconductive properties at 40K, a temperature at which helium is a vapor. It is also believed that magnesium diboride can be combined with any one of the conductive matrix materials in Table 2 without attacking the conductive matrix material. There is thus no need for an intermediate protective layer. Particles of the magnesium diboride can be located in direct contact to a conductive material discussed with reference to FIG. 1 or 43.

It may be possible to use metallic borides other than magnesium diboride. Other metallic borides such as planar diborides may prove to be useful.

It may also be that a desirable conductive material is attacked by magnesium diboride or another planar diboride. Such an embodiment may require a protective material between the superconductive material and the conductive material.

Gallium-Based Superconductor/Metal Matrix Composite

A superconductor/metal matrix composite (SMMC) may be used which uses gallium or a gallium-based alloy as a ductile matrix metal which is driven to superconductivity by the proximity effect.

High current density SMMC wires and tapes can be fabricated using metal matrix materials that are chemically compatible with the superconductor particles and that possess a high lambda. In general, the higher the lambda (λ), the higher the current-carrying capacity of the final composite.

Gallium metal and its alloys are of particular interest because of the unique properties of gallium itself. In particular:

1) Gallium is a liquid at approximately 30° C. and has a tendency to supercool. This allows for a very uniform distribution of the gallium or gallium-based alloy throughout the SMMC. This may be achieved, for example, by ball milling, planetary milling, or attrition milling of a gallium or the gallium-based alloy with an appropriate superconducting powder. Further, a metal matrix composite composed of Ga and magnesium diboride shows unprecedented strain tolerance with respect to superconducting currents. For example, a 20% by volume Ga MgB₂-based SMMC wire 1 mm in diameter retains nearly 80% of its current carrying properties with 2% bending strain. FIG. 44 shows the Jc of as-drawn (straight) MgB₂/Ga SMMC wire and the Jc of the identical wire after bending the wire around a 25 mm diameter mandrel (˜2% bending strain). Conventional powder-in-tube MgB₂ wire and tape with no matrix metal (i.e., not SMMC) typically lose all current carrying capacity at approximately 1% strain. Further, the Jc of powder-in-tube MgB₂ wire and tape with no matrix metal is known to decrease rapidly at approximately 0.2% to 0.5% strain.

2) Gallium or gallium-based alloys possess very high λ values. The electron-phonon coupling in these materials is known to be extremely high (λ>2). This results in a very high proximity-induced gap within the metal matrix and very high critical currents.

3) Gallium is also known to exhibit polymorphism. The different crystal structures of this material have different λ values, and the gallium or gallium-based metal matrix can be prepared to possess substantially the form of gallium or gallium-based alloy that has the highest λ. In particular, it is well-known that amorphous or disordered materials possess higher λ values than their more ordered counterparts. Gallium and its alloys can easily be made to be substantially amorphous, thus increasing λ and the magnitude of the induced gap in the metal matrix. In the context of an SMMC wire, superconductive properties such as λ and Tc improve when Ga exists in an other-than-bulk state. In particular, they improve when Ga exists in microscopic environments. Thus when Ga is used as a matrix metal in an SMMC wire, the other superconducting material (in this case MgB₂) and the wire itself should exist in a form conducive to creating a microscopic environment for the Ga metal. For example, an SMMC made from Ga and MgB₂ powder should be made from small powder, approximately less than 20 microns, and preferably less than 10 microns, and more preferably less than 1-2 microns. As the particle size decreases, however, the superconductor powder becomes more difficult to be dispersed in the Ga metal. The particle size distribution of the powder may be mono-disperse, polydisperse, or multi-modal, such as bimodal. For example, the powder may be composed of approximately 80% by mass 5 micron diameter particles, and 20% by mass 1 micron diameter particles. The superconductor particles may also be of any shape, from spherical to discoidal to cuboid to rod-shaped to bladed to needle-like to plate-like, among others. The particle morphology of the superconductor particles in the densely-packed SMMC (e.g., within the filament of a powder-in-tube wire) will effect the microstructure of the matrix metal, in this case the microstructure of the Ga in the composite. In all cases, the superconductor particle size, particle size distribution, and shape(s) of the superconductor powder should be chosen to provide microscopic environments for the Ga metal. In other words, the particle size and particle size distribution of the magnesium diboride should be chosen such that the maximum domain size in at least one direction of a continuous region of matrix metal in contact with many superconductor particles is less than 5 microns, and preferably less than 1 micron. In general, the more matrix metal that is in a microscopic environment in the SMMC, the higher the current carrying properties of the associated SMMC wire or tape.

4) SMMC wires with an amorphous, high-lambda metal matrix will have higher critical current densities than SMMC wires with substantially crystalline metal matrix materials.

5) Gallium and gallium-based alloys are well-known to wet the surface of many materials including ceramics. This ability to adhere to the surface of ceramic or other brittle superconducting materials increases the total superconductor/metal surface area of the composite. Since the magnitude of the proximity effect is proportional to the surface area, metal matrix materials that wet the surface of the superconductor will make higher current carrying capacity SMMC based wires. It is also known that the superconductor/Ga interface should be substantially non-reactive with respect to the formation of an insulating barrier such that the proximity effect may exist in the Ga metal layer adjacent to the superconductor. At the same time, a thin barrier or layer of insulating material between the superconductor/Ga interface may enhance the wetting of the superconductor by the Ga, and thus increase the overall contacted surface area. It is possible that the resulting increased surface area will compensate for the detrimental insulating barrier, if the barrier is thin enough, and yield an improved wire. It is known that mechanical milling of magnesium diboride in air will introduce oxide impurities on the surface. Likewise, the use of process control agents, such as stearic acid or isopropanol, during the mechanical milling of magnesium diboride will introduce carbon impurities onto the surface. Thus, it is possible by either controlling the atmosphere or using small amounts of particular milling agents to control the amount of insulating material on the surface of the magnesium diboride.

Additionally, during the mechanical milling of the superconductor powder and the matrix metal, it is possible to use volatile process control agents that can be removed afterwards by heat and/or vacuum, such as isopropanol or mercury metal. The use of proper process control agents allows for the control of the cold-welding processes during the milling procedure and may enhance the coverage of the superconductor particle by the matrix metal, and may result in a more homogeneous mixture of the materials that comprise the SMMC. For example, a mixture of magnesium diboride particles and 20% by volume gallium metal can be milled with a great excess of mercury, which acts as a process control agent. The mercury enhances the dispersion of gallium throughout the mixture during the milling process, and therefore leads to improved surface coverage upon removal of the mercury. It may also be desirable to leave some amount of milling agent in the mixture (metallic or organic) to act as artificial pinning centers in the SMMC which may lead to enhanced current carrying properties in applied magnetic fields in SMMC wire and tape.

A 20% by vol. gallium or gallium-based SMMC wire may be fabricated using the following method:

1) 2.54 grams of MgB2 superconducting powder and 2.32 grams of liquid or solid Ga metal are combined in a planetary ball mill (80 ml vial) with 20 Si3N4 balls (10 mm diameter).

2) The composite powder is milled for a total of 4 hours, at 300 RPM. A process control agent may be used during the milling process if there is excessive cold welding during the mill. The use of process control agents is well-known in the field of mechanical alloying.

3) The milled powder is then loaded into a copper billet and sealed. The billet itself can be materials other than copper, such as niobium, silver, iron, nickel or any other material that is compatible with the SMMC composite and which lends itself to the deformation process.

4) The packed billet is drawn or rolled to a final geometry using well-known wire fabrication methods. Single or multifilament wire or tapes may be made by these methods.

The final conductor consists of a metallic sheath (usually copper) and filament(s) of a magnesium diboride/(gallium or gallium-based) metal matrix composite.

FIG. 45 shows the increased performance of the gallium-based SMMC tape relative to Indium-based SMMC tape. Both tapes use MgB2 and the superconducting material, but it is clear that the gallium-based SMMC conductor has much higher engineering current densities than the Indium-based SMMC.

Gallium or gallium-based conductors may be made in a variety of geometries (e.g., single multifilament, round wire or tape) with a variety of superconducting powders.

The only requirement is that the superconductor/(gallium or gallium-based) metal interface be substantially non-reactive with respect to the formation of an insulating barrier such that the proximity effect may exist in the (gallium or gallium-based) metal layer adjacent to the superconductor.

Depending on the superconductor, the gallium-based metal, and the composite preparation conditions, these procedures may need to be carried out under inert atmospheric conditions.

Bismuth-Based Superconductor/Metal Matrix Composite

A superconductor/metal matrix composite (SMMC) may be used which uses bismuth or a bismuth-based alloy as a ductile matrix metal which is driven to superconductivity by the proximity effect.

High current density SMMC wires and tapes can be fabricated using metal matrix materials that are chemically compatible with the superconductor particles and that possess a high lambda. In general, the higher the λ, the higher the current-carrying capacity of the final composite.

Bismuth metal and its alloys are of particular interest because of the unique properties of bismuth itself. In particular:

-   -   1) The electronic properties of bismuth are significantly         different from most metals due to its complex Fermi surface,         which is comprised of pockets of electrons and holes with small         effective masses. The inelastic electron (hole) mean free path         of bismuth is several orders of magnitude larger than most         metals and can be nearly 1 millimeter at 4.2K. This allows for         the proximity effect to penetrate deeply into the metal matrix         material.     -   2) Bismuth or bismuth-based alloys possess very high lambda         values. The electron-phonon coupling in these materials is known         to be extremely high (>2). This results in a very high         proximity-induced gap within the metal matrix and very high         critical currents.

A 20% by vol. bismuth or bismuth-based SMMC wire may be fabricated using the following method:

-   -   1) 4.08 grams of MgB2 superconducting powder and 3.92 grams of         Bismuth metal powder are combined in a planetary ball mill (80         ml vial) with 5 WC balls (10 mm diameter) and 1 WC ball (25 mm         diameter).     -   2) The composite powder is milled for a total of 1 hour, at 500         RPM. A process control agent may be used during the milling         process if there is excessive cold welding during the mill. The         use of process control agents is well-known in the field of         mechanical alloying. The use of multiple size balls may         eliminate the need for use of a process control agent.     -   3) The milled powder is then loaded into a copper billet and         sealed. The billet itself can be materials other than copper,         such as niobium, silver, iron, nickel or any other material that         is compatible with the SMMC composite and which lends itself to         the deformation process. Alternatively, the milled powder may be         annealed in a controlled atmosphere before loading into the         billet to restore the crystalline order of the superconductor         particles (i.e., MgB2) and increase the magnitude of         superconductivity on the surface of the particle. This may         amplify the magnitude of the proximity effect in the metal         matrix material     -   4) The packed billet is drawn or rolled to a final geometry         using well-known wire fabrication methods. Single or         multifilament wire or tapes may be made by these methods.

The final conductor consists of a metallic sheath (usually copper) and filament(s) of a magnesium diboride/(bismuth or bismuth-based) metal matrix composite.

Bismuth or bismuth-based conductors may be made in a variety of geometries (e.g., single multifilament, round wire or tape) with a variety of superconducting powders.

The only requirement is that the superconductor/(bismuth or bismuth-based) metal interface be substantially non-reactive with respect to the formation of an insulating barrier such that the proximity effect may exist in the (bismuth or bismuth-based) metal layer adjacent to the superconductor.

Depending on the superconductor, the bismuth-based metal, and the composite preparation conditions, these procedures may need to be carried out under inert atmospheric conditions.

FIG. 46 shows scanning electron microscope images of the several embodiments of mono-filamentary SMMC powder-in-tube wire. The images shows the microstructure of the magnesium diboride/metal composites as well, with the light areas identified at the metal matrix and the dark areas as the MgB2 particles. All wires shown are encased in a copper sheath.

FIG. 47 shows the reaction of gallium metal with the copper sheath in a MgB2/Ga (20% by volume) powder-in-tube wire. The light band of material between the copper sheath and the MgB2/Ga SMMC is an alloy of copper and gallium. Even with this reaction at the SMMC/sheath interface, this wire has a Jc in excess of 10,000 A/cm-2 at 20K. This demonstrates that a certain degree of reactivity between the sheath and the SMMC is tolerable in some cases. Also, the addition of a non-reactive liner (e.g., lead or niobium) will prevent the formation of the copper/gallium alloy and may result in higher current carrying properties.

As described above, the billet used to make the SMMC wire or tape may include a liner. Typically, copper (and its alloys) is preferred as the billet material because of its low resistivity, high heat capacity and high thermal conductivity. If gallium is the matrix metal chosen, suitable liner materials include niobium and lead. The thickness of the liner should be sufficient to prevent significant reaction between the matrix metal and the copper during processing, but should be thin enough so that the wire still has considerable thermal dissipation properties from the copper sheath. Additionally, the wire may include a core material positioned along the central axis of the filament. The core material may or may not be superconducting. The presence of a core material may enhance the compressibility of the metal matrix composite, which may be desirable, for instance in the case of gallium. The cross section of the wire need not be circular—a tape or rectangular cross-section may also be envisioned. Furthermore, multi-filament wires may be used.

The billet may be made into a wire by various means, including die reduction and rolling. Also, the percentage of reduction per pass as well as draw speeds can be varied to obtain optimal wire properties. The deformation process may be facilitated by sonication, local heat, or cooling at or near the drawing die, all of which may enhance the final filament density of the wire or tape as well as the microstructure of the SMMC in the filament. A final compression of the filament may be achieved by passing a round as drawn wire through a rolling deformation apparatus that changes the aspect ratio of the conductor from a wire to a tape. Final conductor geometries include, but are not limited to, mono-filament wires, multi-filament wires, and tapes.

Heat treatments of the wire may be used. The wire may be heated or cooled during reduction, including before, during, as well as after. If chemical incompatibilities exist between the matrix metal, superconducting particle, or the sheath/billet material, care must be taken to avoid deleterious reactions.

It may also be desirable to create a metal matrix composed of more than one metal, for instance Bi—Pb. Furthermore, it may be desirable to create a metal matrix composed of a plurality of metals that are poorly miscible, such as gallium and mercury. The reason is that the addition of another metal may enhance the wetting and thus enhance the surface coverage of the metals. Also, the inelastic mean free path may be enhanced in the metal matrix when the two metals are poorly miscible and thus, do not form alloys. It may also be desirable to add other components, such as insulating, semiconducting, or metallic nanoparticles, to act as artificial pinning centers within the metal matrix. Carbon nanotubes and silicon carbide nanoparticles are examples.

The magnesium diboride superconducting particles may be synthesized by a variety of means. These include mechanical milling of precursor powders such as magnesium and boron, spray pyrolysis of precursor components, synthesis via a reduction in liquid ammonia or molten salts, etc. In some cases, the matrix metal or matrix metal precursor may be present during the reaction, for instance adding gallium to the mechanical milling synthesis. Other more expensive methods, such as sputtering and evaporation, can also be used. In all cases, the synthesis may include heat treatments to establish the high superconducting critical temperature of the MgB2.

Many devices can be envisaged to use such wire. These include superconducting transformers, generators, motors, fault current limiters, electrical transmission cables and connectors.

A superconducting connection between two superconducting wires, for example, may be formed by using the SMMC composite in an appropriate sheath. A fully superconducting junction may be established between two superconducting wires in the following manner.

1) The ends of superconducting wires are cleaned to remove any insulating contaminants and sliced to expose a large surface area of superconducting filaments within the sheath.

2) A SMMC is packed into a copper tube open at both ends. The initial loose pack of the powder allows for the insertion of both wires into each end of the copper tube. The exposed areas of the superconductor wires are embedded fully into the SMMC composite.

3) The copper tube containing the SMMC and the superconducting wires which have been inserted into the ends is then compressed using deformation techniques well known in the art. The tube may be compressed for example using a cold or hot isostatic press, a rolling mill, or a hydraulic press. The resulting deformation increases the packing density of the SMMC and increases the effective contact area between the SMMC and the end of the superconducting wire.

This connection may be used to connect two or more distinct superconducting wires to create a longer superconducting wire, or to close the ends of a single superconducting wire to create a superconducting loop.

Heat treatments of the final connection may be used. The connection may be heated or cooled during the deformation, including before, during, as well as after. If chemical incompatibilities exist between the matrix metal, superconducting particle, the sheath/billet material, or the superconducting wire material care must be taken to avoid deleterious reactions.

The current carrying properties of the connection between the superconducting wires and the SMMC may be enhanced by selecting metal matrix materials in the SMMC that wet the material in the superconducting wire.

Connections such as this may be used to establish fully superconducting loops, or as persistent switches in superconducting solenoids. The state of the persistent switch may be controlled thermally or magnetically depending on the specific current carrying properties of the SMMC.

While certain exemplary embodiments have been described and shown in the accompanying drawings, it is to be understood that such embodiments are merely illustrative and not restrictive of the current invention, and that this invention is not restricted to the specific constructions and arrangements shown and described since modifications may occur to those ordinarily skilled in the art. 

1. A superconductor, comprising: a plurality of particles made of a superconductive material; and a conductive material at least including bismuth semimetal, an unbroken section of the conductive material being located sufficiently close to the plurality of the particles to be driven to a superconductive state by the plurality of particles.
 2. The superconductor of claim 1, wherein the superconductive material is magnesium diboride.
 3. The superconductor of claim 1, wherein the unbroken section of the conductive material is in contact with the plurality of particles.
 4. The superconductor of claim 1, wherein a substantial volume of the unbroken section of the conductive material being located at a distance greater than the thermal limit of the proximity decay length and less than the inelastic mean free path of the superconductive material from the plurality of particles at a temperature less than the superconducting critical temperature of the plurality of particles.
 5. The superconductor of claim 1, wherein the bismuth semimetal has a larger inelastic mean free pat than lead/bismuth alloy at 20K.
 6. The superconductor of claim 5, wherein the bismuth semimetal has an inelastic mean free path at 20K of at least 2000 nm.
 7. A method of making a superconductor, comprising: forming a plurality of particles of a superconductive material; and locating a conductive material adjacent the plurality of particles, the conductive material at least including bismuth semimetal, and an unbroken length of the conductive material being in sufficiently close proximity to the plurality of the particles to be driven to a superconductive state by the plurality of particles.
 8. The method of claim 7, wherein the superconductive material is magnesium diboride.
 9. The method of claim 8, further comprising: assembling an elongate member from the unbroken length of the conductive material and the plurality of particles; and drawing the elongate member into a wire.
 10. The method of claim 7, wherein a substantial volume of the unbroken section of the conductive material being located at a distance greater than the thermal limit of the proximity decay length and less than the inelastic mean free path of the superconductive material from the plurality of particles of superconductive material at a temperature less than the superconducting critical temperature of the plurality of particles.
 11. The method of claim 7, wherein the bismuth semimetal has a larger inelastic mean free pat than lead/bismuth alloy at 20K.
 12. The method of claim 11, wherein the bismuth semimetal has an inelastic mean free path at 20K of at least 2000 nm. 